Geometric Back-Propagation in Morphological Neural Networks
- Rick Groenendijk ,
- L. Dorst ,
- T. Gevers
Abstract
This paper provides a definition of back-propagation through geometric
correspondences for morphological neural networks. In addition, dilation
layers are shown to learn probe geometry by erosion of layer inputs and
outputs. A proof-of-principle is provided, in which predictions and
convergence of morphological networks significantly outperform
convolutional networks.